How to use an anonymous function in a ''for''?
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Hi everyone!!
I'm trying to write a general solution for a differential equation using a moment method (Galerkin, with polynomials as base functions). When I try to write the general solution por N polynomials, the anonymous function that I'm using, it doesnt update with every loop. I write my code:
N = 10; %number of elements;
l = zeros([N,N]);
g = zeros(N,1);
A = zeros (N,1);
f = @(x) 0;
for i=1:N
for k = 1:N;
l(i,k) = i*k/(i+k+1);
g(k,1) = (k*(8+3*k))/(2*(2+k)*(4+k));
A = linsolve(l,g);
f = @(x) f(x) + A(i,1)*(x - x.^(i+1));
end
end
Thanks!!
3 Comments
Star Strider
on 15 Oct 2020
First, this will fail because it uses ‘recursion’:
f = @(x) f(x) + A(i,1)*(x - x.^(i+1));
Second, what is the argument to the function supposed to be? It cannot be ‘x’ (as you called it with ‘f(x)’) because ‘x’ does not exist.
Migue Balma
on 15 Oct 2020
The function I want to create is:
Where the element A(i,1) has the coefficient I want. I use a for in that anonymous function because I want to have it regardless of the value of N. If N = 3, I should have 3 polynomials and so on.
Thank you!!
Steven Lord
on 15 Oct 2020
Use the sum function and element-wise operations inside the anonymous function.
Accepted Answer
Asad (Mehrzad) Khoddam
on 15 Oct 2020
if you don't need to use it inside loop. you can define f(x) after for loop:
N = 10; %number of elements;
l = zeros([N,N]);
g = zeros(N,1);
A = zeros (N,1);
for i=1:N
for k = 1:N;
l(i,k) = i*k/(i+k+1);
g(k,1) = (k*(8+3*k))/(2*(2+k)*(4+k));
A = linsolve(l,g);
f = @(x) f(x) + A(i,1)*(x - x.^(i+1));
end
end
f = @(x) sum(A'.*(x-x.^(2:N+1)));
1 Comment
Migue Balma
on 15 Oct 2020
Edited: Migue Balma
on 15 Oct 2020
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